A "saddle point" (or maximum-minimum) principle is set up for the quasi-static boundary-value problem in linear viscoelasticity. The appropriate class of convolution-type functionals for it is taken in terms of bilinear forms with a weight function involving the Fourier transform. The "minimax" property is shown to hold as a direct consequence of thermodynamic restrictions on the relaxation function. This approach can be extended to further linear evolution problems where initial data are not prescribed. © 1992 Kluwer Academic Publishers.
Giorgi, C., Marzocchi, A., New variational principles in quasi-static viscoelasticity, <<JOURNAL OF ELASTICITY>>, 1992; 29 (1): 85-96. [doi:10.1007/BF00043446] [https://hdl.handle.net/10807/268498]
New variational principles in quasi-static viscoelasticity
Marzocchi, AlfredoSecondo
1992
Abstract
A "saddle point" (or maximum-minimum) principle is set up for the quasi-static boundary-value problem in linear viscoelasticity. The appropriate class of convolution-type functionals for it is taken in terms of bilinear forms with a weight function involving the Fourier transform. The "minimax" property is shown to hold as a direct consequence of thermodynamic restrictions on the relaxation function. This approach can be extended to further linear evolution problems where initial data are not prescribed. © 1992 Kluwer Academic Publishers.
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